Conic James' Compactness Theorem
Journal of convex analysis, Tome 25 (2018) no. 4, pp. 1335-1344
The following results is proved:\par Let $A$ be a convex bounded non weakly relatively compact subset of a Banach space $E$. We consider a convex weakly compact subset $D$ of $E$ which does not contain the origin.\par Then there is a sequence $\left\{x_n^*\right\}_{n\ge 1}$ in $B_{E^*}$ and $g_0^*\in \hbox{co}_{\sigma}\{x_n^*:n\ge 1\}$ such that for all $h\in \ell_\infty (A)$ satisfying that for all $a\in A,$ $$ \liminf_{n\ge 1}x_n^*(a) \le h(a) \le\limsup_{n\ge 1}x_n^*(a), $$ we have that\ \ $g_0^*- h$\ \ does not attain its supremum on $A$ and\ \ $( g_0^*- h)(d)>0$\ \ for every $d\in D$.
Classification :
46A50, 46B50
Mots-clés : James' compactness theorem, weakly compact set
Mots-clés : James' compactness theorem, weakly compact set
@article{JCA_2018_25_4_JCA_2018_25_4_a13,
author = {J. Orihuela},
title = {Conic {James'} {Compactness} {Theorem}},
journal = {Journal of convex analysis},
pages = {1335--1344},
year = {2018},
volume = {25},
number = {4},
url = {http://geodesic.mathdoc.fr/item/JCA_2018_25_4_JCA_2018_25_4_a13/}
}
J. Orihuela. Conic James' Compactness Theorem. Journal of convex analysis, Tome 25 (2018) no. 4, pp. 1335-1344. http://geodesic.mathdoc.fr/item/JCA_2018_25_4_JCA_2018_25_4_a13/